`y' = -sqrt(x)/(4y)`
Solve the differential equation.

An ordinary differential equation (ODE) is differential equation for the derivative of a function of one variable. When an ODE is in a form of `y'=f(x,y)` , this is just a first order ordinary differential equation.

The given problem: `y' = -sqrt(x)/(4y)` is in a form of `y'=f(x,y)` .

To evaluate this, we may express `y'` as `(dy)/(dx)` .

The problem becomes:

`(dy)/(dx)= -sqrt(x)/(4y)`

We may apply the variable separable differential equation: `N(y)...

An ordinary differential equation (ODE) is differential equation for the derivative of a function of one variable. When an ODE is in a form of `y'=f(x,y)` , this is just a first order ordinary differential equation.